diff options
author | Enrico Tassi <gareuselesinge@debian.org> | 2016-12-27 16:53:30 +0100 |
---|---|---|
committer | Enrico Tassi <gareuselesinge@debian.org> | 2016-12-27 16:53:30 +0100 |
commit | a4c7f8bd98be2a200489325ff7c5061cf80ab4f3 (patch) | |
tree | 26dd9c4aa142597ee09c887ef161d5f0fa5077b6 /test-suite/bugs/closed/3699.v | |
parent | 164c6861860e6b52818c031f901ffeff91fca16a (diff) |
Imported Upstream version 8.6upstream/8.6
Diffstat (limited to 'test-suite/bugs/closed/3699.v')
-rw-r--r-- | test-suite/bugs/closed/3699.v | 16 |
1 files changed, 6 insertions, 10 deletions
diff --git a/test-suite/bugs/closed/3699.v b/test-suite/bugs/closed/3699.v index aad0bb44..efa43252 100644 --- a/test-suite/bugs/closed/3699.v +++ b/test-suite/bugs/closed/3699.v @@ -34,8 +34,7 @@ Module NonPrim. : forall b:B, P b. Proof. intros b. - unshelve (refine (pr1 (isconnected_elim _ _))). - exact b. + unshelve (refine (pr1 (isconnected_elim (A:=hfiber f b) _ _))). intro x. exact (transport P x.2 (d x.1)). Defined. @@ -47,8 +46,7 @@ Module NonPrim. : forall b:B, P b. Proof. intros b. - unshelve (refine (pr1 (isconnected_elim _ _))). - exact b. + unshelve (refine (pr1 (isconnected_elim (A:=hfiber f b) _ _))). intros [a p]. exact (transport P p (d a)). Defined. @@ -65,7 +63,7 @@ Module NonPrim. set (fibermap := fun a0p : hfiber f (f a) => let (a0, p) := a0p in transport P p (d a0)). Set Printing Implicit. - let G := match goal with |- ?G => constr:G end in + let G := match goal with |- ?G => constr:(G) end in first [ match goal with | [ |- (@isconnected_elim n (@hfiber A B f (f a)) (@isconnected_hfiber_conn_map n A B f H (f a)) @@ -111,8 +109,7 @@ Module Prim. : forall b:B, P b. Proof. intros b. - unshelve (refine (pr1 (isconnected_elim _ _))). - exact b. + unshelve (refine (pr1 (isconnected_elim (A:=hfiber f b) _ _))). intro x. exact (transport P x.2 (d x.1)). Defined. @@ -124,8 +121,7 @@ Module Prim. : forall b:B, P b. Proof. intros b. - unshelve (refine (pr1 (isconnected_elim _ _))). - exact b. + unshelve (refine (pr1 (isconnected_elim (A:=hfiber f b) _ _))). intros [a p]. exact (transport P p (d a)). Defined. @@ -142,7 +138,7 @@ Module Prim. set (fibermap := fun a0p : hfiber f (f a) => let (a0, p) := a0p in transport P p (d a0)). Set Printing Implicit. - let G := match goal with |- ?G => constr:G end in + let G := match goal with |- ?G => constr:(G) end in first [ match goal with | [ |- (@isconnected_elim n (@hfiber A B f (f a)) (@isconnected_hfiber_conn_map n A B f H (f a)) |